A Note on Ordinal DFAs

Abstract

We prove the following theorem. Suppose that M is a trim DFA on the Boolean alphabet 0,1. The language (M) is well-ordered by the lexicographic order iff whenever the non sink states q,q.0 are in the same strong component, then q.1 is a sink. It is easy to see that this property is sufficient. In order to show the necessity, we analyze the behavior of a -descending sequence of words. This property is used to obtain a polynomial time algorithm to determine, given a DFA M, whether (M) is well-ordered by the lexicographic order. Last, we apply an argument in BE,BEa to give a proof that the least nonregular ordinal is ωω .